English

Irreducibility and r-th root finding over finite fields

Computational Complexity 2017-02-03 v1 Commutative Algebra Number Theory

Abstract

Constructing rr-th nonresidue over a finite field is a fundamental computational problem. A related problem is to construct an irreducible polynomial of degree rer^e (where rr is a prime) over a given finite field Fq\mathbb{F}_q of characteristic pp (equivalently, constructing the bigger field Fqre\mathbb{F}_{q^{r^e}}). Both these problems have famous randomized algorithms but the derandomization is an open question. We give some new connections between these two problems and their variants. In 1897, Stickelberger proved that if a polynomial has an odd number of even degree factors, then its discriminant is a quadratic nonresidue in the field. We give an extension of Stickelberger's Lemma; we construct rr-th nonresidues from a polynomial ff for which there is a dd, such that, rdr|d and rr\nmid\,#(irreducible factor of f(x)f(x) of degree dd). Our theorem has the following interesting consequences: (1) we can construct Fqm\mathbb{F}_{q^m} in deterministic poly(deg(ff),mlogqm\log q)-time if mm is an rr-power and ff is known; (2) we can find rr-th roots in Fpm\mathbb{F}_{p^m} in deterministic poly(mlogpm\log p)-time if rr is constant and rgcd(m,p1)r|\gcd(m,p-1). We also discuss a conjecture significantly weaker than the Generalized Riemann hypothesis to get a deterministic poly-time algorithm for rr-th root finding.

Keywords

Cite

@article{arxiv.1702.00558,
  title  = {Irreducibility and r-th root finding over finite fields},
  author = {Vishwas Bhargava and Gábor Ivanyos and Rajat Mittal and Nitin Saxena},
  journal= {arXiv preprint arXiv:1702.00558},
  year   = {2017}
}

Comments

16 pages

R2 v1 2026-06-22T18:07:26.506Z